Constructive completions of ordered sets, groups and fields

Annals of Pure and Applied Logic 135 (1-3):243-262 (2005)
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Abstract

In constructive mathematics it is of interest to consider a more general, but classically equivalent, notion of linear order, a so-called pseudo-order. The prime example is the order of the constructive real numbers. We examine two kinds of constructive completions of pseudo-orders: order completions of pseudo-orders and Cauchy completions of ordered groups and fields. It is shown how these can be predicatively defined in type theory, also when the underlying set is non-discrete. Provable choice principles, in particular a generalisation of dependent choice, are used for showing set-representability of cuts

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10.1016/j.apal.2004.12.005

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Citations of this work

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On constructing completions.Laura Crosilla, Hajime Ishihara & Peter Schuster - 2005 - Journal of Symbolic Logic 70 (3):969-978.
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References found in this work

On completing ordered fields.Dana Scott - 1969 - In W. A. J. Luxemburg (ed.), Applications of model theory to algebra, analysis, and probability. New York,: Holt, Rinehart and Winston. pp. 274--278.
An Intuitionistic Axiomatisation of Real Closed Fields.Erik Palmgren - 2002 - Mathematical Logic Quarterly 48 (2):297-299.

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